Hardy and Rellich inequalities with Bessel pairs (2101.07008v1)
Abstract: In this paper, we establish suitable characterisations for a pair of functions $(W(x),H(x))$ on a bounded, connected domain $\Omega \subset \mathbb{R}n$ in order to have the following Hardy inequality \begin{equation*} \int_{\Omega} W(x) |\nabla u|A2 dx \geq \int{\Omega} |\nabla d|2_AH(x)|u|2 dx, \,\,\, u \in C{1}_0(\Omega), \end{equation*} where $d(x)$ is a suitable quasi-norm (gauge), $|\xi|2_A = \langle A(x)\xi, \xi \rangle$ for $\xi \in \mathbb{R}n$ and $A(x)$ is an $n\times n$ symmetric, uniformly positive definite matrix defined on a bounded domain $\Omega \subset \mathbb{R}n$. We also give its $Lp$ analogue. As a consequence, we present examples for a standard Laplacian on $\mathbb{R}n$, Baouendi-Grushin operator, and sub-Laplacians on the Heisenberg group, the Engel group and the Cartan group. Those kind of characterisations for a pair of functions $(W(x),H(x))$ are obtained also for the Rellich inequality. These results answer the open problems of Ghoussoub-Moradifam \cite{GM_book}.